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Worked solutions Chapter 1 Exercises 1 For each of these questions (a) to (e): ●● ●● ●● write the information from the question in the form of an equation check the number of atoms on each side of the equation introduce coefficients in front of the formulae in order to ensure that there are equal numbers of atoms on each side of the equation. (a) CuCO3 → CuO + CO2 (b) 2Mg + O2 → 2MgO (c) H2SO4 + 2NaOH → Na2SO4 + 2H2O (d) N2 + 3H2 → 2NH3 (e) CH4 + 2O2 → CO2 + 2H2O (c) Sugar dissolves in water to give a clear solution – homogeneous. (If it is a saturated solution with excess sugar that cannot dissolve, the overall mixture is then heterogeneous.) (d) Salt and iron filings mix but don’t interact with each other – heterogeneous. (e) Ethanol dissolves in water to give a clear solution – homogeneous. (f) Steel consists of an alloy of iron and carbon, it has the same properties throughout – homogeneous. 5 For each of questions (a) to (e): ●● 2 For each of these questions (a) to (e): ●● introduce coefficients in front of each formula to ensure that there are equal numbers of atoms on each side of the equation. (a) 2K + 2H2O → 2KOH + H2 (b) C2H5OH + 3O2 → 2CO2 + 3H2O (c) Cl2 + 2KI → 2KCl + I2 (d) 4CrO3 → 2Cr2O3 + 3O2 (e) Fe2O3 + 3C → 3CO + 2Fe 3 For each of these questions (a) to (e): ●● introduce coefficients in front of each formula to ensure that there are equal numbers of atoms on each side of the equation. (a) 2C4H10 + 13O2 → 8CO2 + 10H2O (b) 4NH3 + 5O2 → 4NO + 6H2O (c) 3Cu + 8HNO3 → 3Cu(NO3)2 + 2NO + 4H2O (d) 6H2O2 + 2N2H4 → 2N2 + 10H2O + O2 (e) 4C2H7N + 15O2 → 8CO2 + 14H2O + 2N2 4 (a) Sand is an insoluble solid and water a liquid – heterogeneous. (b) Smoke is made up of solid particles dispersed in air (a gas) – heterogeneous. ●● introduce coefficients in front of each formula to ensure that there are equal numbers of atoms on each side of the equation remember when assigning state symbols that if there is water present and one of the products is soluble, then the symbol aq (aqueous) must be used (water itself as a liquid is always (l), never (aq)). (a) 2KNO3(s) → 2KNO2(s) + O2(g) (b) CaCO3(s) + H2SO4(aq) → CaSO4(s) + CO2(g) + H2O(l) (c) 2Li(s) + 2H2O(l) → 2LiOH(aq) + H2(g) (d) Pb(NO3)2(aq) + 2NaCl(aq) → PbCl2(s) + 2NaNO3(aq) (e) 2C3H6(g) + 9O2(g) → 6CO2(g) + 6H2O(l) 6 X has diffused more quickly, so it must be a lighter gas. Its particles have greater velocity than the particles of Y at the same temperature. (They will, however, both have the same average kinetic energy.) 7 From the kinetic molecular theory we would expect a solid to be more dense than its liquid. We would expect that ice would sink in water. That ice floats is an indication that something 1 else is involved in the structure of ice (see page 152). 8 Bubbles will be present through the volume of the liquid. A brown gas is visible above the brown liquid. As the two states are at the same temperature, the particles have the same average kinetic energy and are moving at the same speed. The inter-particle distances in the gas are significantly larger than those in the liquid. 1 mole of H2O contains 2 × (6.02 × 1023) hydrogen atoms 1 mole of H2O contains 1.20 × 1024 hydrogen atoms 2.50 moles therefore contains (1.20 × 1024) × 2.50 hydrogen atoms = 3.01 × 1022 hydrogen atoms (c) 1 mole of Ca(HCO3)2 contains 2 moles of hydrogen atoms 9 At certain conditions of low temperature and low humidity, snow changes directly to water vapour by sublimation, without going through the liquid phase. 1 mole of Ca(HCO3)2 contains 2 × (6.02 × 1023) hydrogen atoms 1 mole of Ca(HCO3)2 contains 1.20 × 1024 hydrogen atoms 10 Steam will condense on the skin, releasing energy as it forms liquid at the same temperature (e–d on Figure 1.4). This energy is in addition to the energy released when both the boiling water and the condensed steam cool on the surface of the skin. 0.10 moles therefore contains (1.20 × 1024) × 0.10 hydrogen atoms = 1.2 × 1023 hydrogen atoms 11 B, as a change of state is taking place. 12 temperature / °C 80 liquid 35 solid forming solid cooling 25 room temperature 14 Propane contains three carbon atoms and eight hydrogen atoms. If the three carbon atoms are equivalent to 0.20 moles of carbon then one carbon atom would be equivalent to 0.20/3 moles of carbon. So eight atoms of hydrogen would be equivalent to (0.20/3) × 8 moles of hydrogen, i.e. 0.53 moles of H. 15 Sulfuric acid contains four oxygen atoms. If there are 6.02 × 1023 atoms of oxygen in total then there must be (6.02 × 1023)/4 molecules of sulfuric acid, i.e. 1.51 × 1023 molecules of sulfuric acid (= 0.250 mol of sulfuric acid). 16 (a) Magnesium phosphate, Mg3(PO4)2 time Relative atomic mass Number of atoms of each element Mg 24.31 3 72.93 P 30.97 2 61.94 O 16.00 8 128.00 13 Use L = 6.02 × 1023 mol–1. Element (a) 1 mole of C2H5OH contains 6 moles of hydrogen atoms 1 mole of C2H5OH contains 6 × (6.02 × 1023) hydrogen atoms 1 mole of C2H5OH contains 3.61 × 10 hydrogen atoms 0.020 moles therefore contains (3.61 × 1024) × 0.020 hydrogen atoms = 7.2 × 1022 hydrogen atoms 24 (b) 1 mole of H2O contains 2 moles of hydrogen atoms 2 Molar mass Relative mass 262.87 g mol–1 (b) Ascorbic acid, C6H8O6 Mass = nM = 0.475 mol × 398.08 g mol–1 = 189.1 g Relative atomic mass Number of atoms of each element C 12.01 6 72.06 H 1.01 8 8.08 O 16.00 6 96.00 Element Molar mass Relative mass 176.14 g mol M of CO2 = (12 + (16 × 2)) g mol–1 = 44 g mol–1 m 66 g = moles = = 1.5 mol M 44 g mol–1 –1 Element Number of atoms of each element Relative mass Ca 40.08 1 40.08 N 14.01 2 28.02 O 16.00 6 96.00 Molar mass 164.10 g mol–1 (d) Hydrated sodium thiosulfate, Na2S2O3.5H2O Relative atomic mass Number of atoms of each element Na 22.99 2 45.98 S 32.07 2 64.14 O 16.00 8 128.00 H 1.01 10 10.10 Element Molar mass 19 Copper(II) chloride, CuCl2, has M of (63.55 + (35.45 × 2)) g mol–1 = 134.45 g mol–1 0.50 g is equivalent to (0.50 g/134.45 g mol–1) mol of copper chloride, i.e. 3.7 × 10–3 mol (c) Calcium nitrate, Ca(NO3)2 Relative atomic mass 18 (If not using a calculator, use rounded values for Ar.) Relative mass 248.22 g mol–1 17 Calculate the molar mass of calcium arsenate, Ca3(AsO4)2 There are two chloride ions in copper chloride, CuCl2 There must be 2 × (3.7 × 10–3) mol of chloride ions present, i.e. 7.4 × 10–3 mol (= 0.0074 mol) 20 36.55 g of carbon = 36.55 g/12.01 g mol–1 = 3.043 mol of carbon 1 mole of carbon contains 6.02 × 1023 atoms of carbon Therefore 3.043 moles of carbon contain 3.043 × (6.02 × 1023) atoms of carbon, i.e. 1.83 × 1024 atoms 21 (If not using a calculator, use rounded values for Ar.) Calculate the Mr of sucrose, C12H22O11 Relative atomic mass Number of atoms of each element Relative mass carbon 12 12 144 hydrogen 1 22 22 oxygen 16 11 176 Element M 342 g mol–1 Relative atomic mass Number of atoms of each element Ca 40.08 3 120.24 As 74.92 2 149.84 Water: the Mr of H2O is 18 (= 16 + 2 × 1) O 16.00 8 128.00 Therefore 10.0 g of water is equivalent to (10 g/18 g mol–1) mol of water (= 0.55 mol) Element Molar mass Relative mass 398.08 g mol–1 Mass = nM = 0.500 mol × 342 g mol–1 = 171 g 22 (If not using a calculator, use rounded values for Ar.) Mercury: the relative atomic mass of mercury is 201 3 Therefore 10.0 g is equivalent to (10 g/201 g mol–1) mol of mercury (≈ 0.05 mol) 26 10.0 g of water contains more particles than 10.0 g of mercury. 23 (If not using a calculator, use rounded values for Ar.) Mr of N2H4 is (2 × 14) + (4 × 1) = 32, therefore 1.0 mol has a mass of 32 g Mr of N2 is (2 × 14) = 28, therefore 2.0 mol has a mass of 56 g Mr of NH3 is 14 + (3 × 1) = 17, therefore 3.0 mol has a mass of 51 g Mr of H2 is (2 × 1) = 2, therefore 25.0 mol has a mass of 50 g Sulfur 1.14 Water (H2O) Oxygen mass / g 2.10 2.28 4.50 moles 2.10 = 1.14 = 2.28 = 4.50 = 58.93 32.07 16.00 18.02 0.0356 0.0355 0.143 0.250 divide by smallest 1.00 1.00 4.03 7.04 nearest whole number ratio 1 1 4 7 The empirical formula is CoSO4.7H2O 27 Carbon Hydrogen Nitrogen So in order of decreasing order of mass: % by mass 83.89 10.35 5.76 2.0 mol nitrogen > 3.0 mol ammonia > 25.0 mol hydrogen > 1.0 mol hydrazine moles 83.89 = 12.01 6.985 10.35 = 1.01 10.2 5.76 = 14.01 0.411 divide by smallest 17.0 24.8 1.00 nearest whole number ratio 25 1 24 (a)C2H2: the ratio of carbon to hydrogen atoms can be simplified to CH (b) C6H12O6: the ratio of atoms can be simplified to CH2O (c) C12H22O11: the ratio of atoms cannot be simplified – the empirical and molecular formula are the same. (d) C8H18: the ratio of atoms can be simplified to C4H9 (e) C8H14: the ratio of atoms can be simplified to C4H7 (f) CH3COOH, i.e. C2H4O2: the ratio of atoms can be simplified to CH2O 25 Sodium Sulfur Oxygen mass / g 0.979 1.365 1.021 moles 0.979 = 22.99 0.0426 1.365 = 32.07 0.0426 1.021 = 16.00 0.06381 divide by smallest 1.00 1.00 1.50 nearest whole number ratio 2 3 2 The empirical formula is Na2S2O3 4 Cobalt 17 The empirical formula is C17H25N 28 Mr of NH3 = 14.01 + (3 × 1.01) = 17.04 14.01 × 100 = 82.22% 17.04 Mr of CO(NH2)2 = 12.01 + 16.00 + 2 × [14.01 + (2 × 1.01)] = 62.07 % by mass of N is 28.02 × 100 = 45.14% 62.07 (Note: 28.02 since there are two nitrogen atoms in the molecule) % by mass of N is Mr of (NH4)2SO4 = (2 × 14.01) + (8 × 1.01) + 32.07 + (4 × 16.00) = 132.17 28.02 × 100 = 21.20% 132.17 (Note: 28.02 since there are two nitrogen atoms in the molecule) % by mass of N is So overall, ammonia, NH3, has the highest % by mass of nitrogen. 29 moles of nitrogen = 0.673 g/14.01 g mol–1 = 0.0480 mol In the formula there are 3 moles of nitrogen associated with each mole of metal. Therefore moles of metal in the compound = 3 × 0.0480 = 0.144 atomic mass = 32 mass 1.00 g = = 6.94 g moles 0.144 g mol–1 mol–1 The relative atomic mass of the element is 6.94. By looking at the periodic table (section 6 of the IB data booklet), it can be seen that the element is lithium. For CdTe, percentage by mass = 112.41 × 100 = 46.84% 112.41 + 127.60 Overall, CdS has the highest percentage by mass of cadmium. You could also approach this question by considering the Ar of the other element in the compound. Sulfur has the lowest Ar and so CdS will have the highest percentage by mass of cadmium. 31 Carbon Hydrogen % by mass 100 – 7.74 = 92.26 7.74 moles 92.26 = 7.681 12.01 Phosphorus 0.3374 0.8821 – (0.0220 + 0.3374) = 0.5227 moles 0.3374 = 30.97 0.01089 0.5227 = 16.00 0.03267 1.00 3.00 1 3 0.0220 = 1.01 0.0218 nearest whole number ratio 2 Empirical formula is therefore H2PO3. This has a mass of 80.99 g mol–1. This number divides into the molar mass of the whole compound twice 162 g mol–1 (i.e. = 2). 80.99 g mol–1 The molecular formula is therefore twice the empirical formula, i.e. H4P2O6 33 Carbon Hydrogen 0.1927 0.02590 0.1124 moles 0.1927 = 12.01 0.01604 0.02590 = 1.01 0.0256 0.1124 = 14.01 0.008022 divide by smallest 3.332 5.32 1.666 nearest whole number ratio 10 16 5 Phosphorus Oxygen mass / g 0.1491 0.3337 divide by smallest 1.00 1.00 moles nearest whole number ratio 1 0.1491 = 30.97 0.004814 0.3337 = 16.00 0.02086 divide by smallest 1.000 4.333 nearest whole number ratio 3 13 Empirical formula is therefore CH. This has a mass of 13.02 g mol–1. This number divides into the molar mass of the whole compound six 78.10 g mol–1 times (i.e. = 6). 13.02 g mol–1 The molecular formula is therefore six times the empirical formula, i.e. C6H6 Nitrogen mass / g 7.74 = 7.66 1.01 1 Oxygen mass / g 0.0220 divide by 2.00 smallest relative atomic mass of cadmium 30 percentage by mass = × 100 Mr ●● For CdS, percentage by mass = 112.41 × 100 = 77.80% 112.41 + 32.07 ●● For CdSe, percentage by mass = 112.41 × 100 = 58.74% 112.41 + 78.96 ●● Hydrogen 5 Note: ●● ●● 35 the mass for oxygen is obtained by subtracting all the masses of the other elements from 0.8138 g the nearest whole number ratio is obtained by multiplying by 3 to round everything up (numbers ending in ‘.33’ and ‘.66’ are the clue here). The empirical formula is C10H16N5O13P3. The formula mass of this is 507 g mol–1 so the empirical and molecular formulae are the same. 0.66 g (12.01 + (2 × 16.00)) g mol–1 = 0.015 mol 34 Moles of CO2 = ●● This is the same as the number of moles of carbon atoms present. 0.36 g (1.01 × (2 + 16.00)) g mol–1 = 0.020 mol Moles of water = ●● Twice this number is the number of moles of hydrogen atoms present, i.e. 0.040 mol. Convert these into masses in order to find the mass of oxygen in the original sample: mass of carbon = 0.015 mol × 12.01g mol–1 = 0.18 g mass of hydrogen = 0.040 mol × 1.01 g mol–1 = 0.040 g therefore mass of oxygen = 0.30 g – 0.18 g – 0.040 g = 0.08 g ● ●● Hydrogen Subtract the values to obtain the mass of chalk used. Calculate the number of moles of chalk used. Let y = the mass of chalk used in g mass used moles of chalk used = Mr(CaCO3) yg = 100.09 g mol–1 This is the same as the number of moles of carbon atoms used. Therefore the number of carbon atoms used = 6.20 x 1023 y moles of chalk × (6.02 × 1023 mol–1) 100.09 36 (a) From the stoichiometric equation 2 moles of iron can be made from 1 mole of iron oxide. Hence 2 × 1.25 mol = 2.50 mol of iron can be made from 1.25 mol of iron oxide. (b) From the stoichiometric equation 2 moles of iron need 3 moles of hydrogen. 3 Hence 3.75 mol of iron need × 3.75 mol = 2 5.63 mol of hydrogen. (c) From the stoichiometric equation 3 moles of water are produced from 1 mole of iron oxide. Hence 12.50 moles of water are produced 1 from × 12.50 mol = 4.167 moles of iron 3 oxide. 4.167 moles of iron oxide have a mass of 4.167 × Mr(Fe2O3) = 4.167 mol × 159.70 g mol–1 = 665.5 g (= 665 g) mass / g 0.18 0.040 0.08 moles 0.040 = 1.01 0.040 0.08 = 16.00 0.005 divide by 3 smallest 8 1 3 8 1 2C4H10 + 13O2 → 8CO2 + 10H2O nearest whole number ratio 0.18 = 12.01 0.015 Empirical formula is C3H8O 6 Oxygen Weigh the chalk before and after the name has been written. ●● Now the calculation can proceed as usual. Carbon 37 (a) Write the chemical equation: C4H10 + O2 → CO2 + H2O Then balance the equation by deducing the appropriate numbers in front of the formulae: (b) From the equation 2 moles of butane produce 10 moles of water. 2.46 g = 0.137 moles of water were 18.02 g mol–1 produced. 0.137 moles of water must have been made from 2 × 0.137 = 0.0274 moles of butane. 10 0.0274 moles of butane has a mass of 0.0274 × Mr(C4H10) = 0.0274 mol × 58.14 g mol–1 = 1.59 g 38 From the equation, 1 mole of Al reacts with 1 mole of NH4ClO4 26.98 g of Al react with 14.01 + (4 × 1.01) + 35.45 + (4 × 16.00) = 117.50 g of NH4ClO4 Therefore 1000 g of Al react with 117.50 × 1000 26.98 = 4355 g = 4.355 kg of NH4ClO4 39 (a)CaCO3 → CaO + CO2 n 0.657 g = = M 44.01 g mol–1 0.0149 moles of CO2 (b) 0.657 g of CO2 = This was produced from 0.0149 moles of CaCO3. 0.0149 moles of CaCO3 has a mass of 0.0149 × Mr(CaCO3) = 0.0149 mol × 100.09 g mol–1= 1.49 g Therefore % of CaCO3 in the impure 1.49 g limestone = × 100 = 92.8% 1.605 g (c) Assumptions are: ●● ●● ●● ●● CaCO3 is the only source of carbon dioxide all the CaCO3 undergoes complete decomposition all CO2 released is captured heating does not cause any change in mass of any of the other minerals present. 12.0 g = 5.94 mol 2.02 g mol–1 74.5 g = 2.66 mol moles of CO = 28.01 g mol–1 As the CO reacts with H2 in a 1 : 2 ratio, this means that the H2 is in excess (2 × 2.66 mol = 5.32 mol). 40 (a) moles of H2 = 2.66 mol of CO therefore produce 2.66 mol of CH3OH. This has a mass of 2.66 × Mr(CH3OH) = 2.66 mol × 32.05 g mol–1 = 85.2 g (b) moles of H2 in excess = 5.94 mol – (2 × 2.66) mol = 0.62 mol This is equivalent to a mass of 0.62 mol × 2.02 g mol–1 = 1.3 g 15.40 g (2 × 12.01) + (4 ×1.01) g mol–1 = 0.5488 mol 41 moles of C2H4 = 3.74 g = 0.0528 mol (2 × 35.45) g mol–1 As the reactants react in the ratio of 1 : 1, C2H4 is in excess. moles of Cl2 = moles of product formed = 0.0528 mol mass of product formed = 0.0528 × Mr(C2H4Cl2) = 0.0528 mol × 98.96 g mol–1 = 5.23 g 255 g (40.08 + 12.01 + (4 × 16.00)) g mol–1 = 2.55 mol 42 moles of CaCO3 = 135 g (32.07 + (2 × 16.00)) g mol–1 = 2.11 mol moles of SO2 = Therefore as they react in a 1 : 1 ratio, the number of moles of CaSO3 produced = 2.11 mol mass of CaSO3 = 2.11 mol × (40.08 + 32.07 + (3 × 16.00)) g mol–1 = 254 g 198 g × 100 254 g mol–1 = 77.9% Therefore percentage yield = 43 moles of CH3COOH used = 3.58 g = ((2 × 12.01) + (4 × 1.01) + (2 × 16.00)) g mol–1 0.0596 mol moles of C5H11OH = 4.75 g = ((5 × 12.01) + (12 × 1.01) + 16.00) g mol–1 0.0539 mol Therefore C5H11OH is the limiting reagent, so 0.0539 mol of CH3COOC5H11 is the maximum that can form. 7 This will have a mass of 0.0539 × [(7 × 12.01) + (14 × 1.01) + (2 × 16.00)] g mol–1 = 7.01 g This is the 100% yield, therefore 45% yield has a mass of 0.45 × 7.01 g = 3.16 g 44 100 g of C6H5Cl is equivalent to 100 g = ((6 × 12.01) + (5 × 1.01) + 35.45) g mol–1 0.888 mol If this is 65% yield then 100% yield would be 100 0.888 mol × = 1.37 mol 65 1.37 moles of benzene has a mass of 1.37 mol × [(6 × 12.01) + (6 × 1.01)] g mol–1 = 107 g 45 (a) 1 mole of gas has a volume of 22.7 dm3 at STP. 54.5 Therefore 54.5 dm3 is equivalent to mol 22.7 = 2.40 mol (b) 1 mole of gas has a volume of 22.7 dm3 at STP. This is equivalent to 22.7 × 1000 cm3 = 227 000 cm3 Therefore 250.0 cm3 of gas contains 250.0 mol = 1.10 × 10–3 mol 227 000 (= 0.0110 mol) (c) 1 mole of gas has a volume of 22.7 dm3 at STP. This is equivalent to 0.0227 m3 1.0 1.0 m3 of gas therefore contains mol 0.0227 = 44 mol 46 (a) 44.00 g of N2 is equivalent to 44.00 g of N2 gas = 1.57 mol (2 × 14.01) g mol–1 1 mole of gas has a volume of 22.7 dm3 at STP. Therefore 1.57 mol has a volume of 35.6 dm3 (b) 1 mole of gas has a volume of 22.7 dm3 at STP. 8 Therefore 0.25 mol of ammonia has a volume of 5.7 dm3 47 moles HgO = 12.45 g = (200.59 + 16.00) g mol–1 0.0575 mol On decomposition this would produce 0.0287 mol of oxygen (since 2 mol of HgO produces 1 mol of O2). 1 mole of gas has a volume of 22.7 dm3 at STP. Therefore 0.0287 mol have a volume of 0.652 dm3 48 Assume all measurements are made at STP. 3.14 dm3 of bromine is equivalent to 3.14 dm3 = 0.138 mol Br2 22.7 mol dm3 11.07 g of chlorine is equivalent to 11.07 g = 0.1561 mol Cl2 (2 × 35.45) g mol–1 Therefore the sample of chlorine contains more molecules. 49 0.200 g calcium is 0.200 g = 40.08 g mol–1 4.99 × 10–3 mol 4.99 × 10–3 mol of Ca will make 4.99 × 10–3 mol of hydrogen 4.99 × 10–3 mol of hydrogen will occupy 4.99 × 10–3 mol × 22.7 dm3 mol–1 = 0.113 dm3 (or 113 cm3) at STP. 50 The first step, as usual, is to calculate how many moles of reactant we have. 1.0 g 1.0 g of ammonium nitrate is = 80.06 g mol–1 0.012 mol According to the balanced chemical equation, 0.012 mol of ammonium nitrate will produce 0.012 mol of dinitrogen oxide. At STP, 1 mole of gas occupies 22.7 dm3, so 0.012 mol will occupy 22.7 dm3 mol–1 × 0.012 mol = 0.28 dm3 P1 × V1 P2 × V2 = T1 T2 List all the data that is given in the question: 51 Using ●● P1 = 85 kPa ●● P2 = ??? ●● V1 = 2.50 dm ●● V2 = 2.75 dm3 ●● T1 = 25 °C (= 298 K) ●● T2 = 75 °C (= 348 K) Rearranging for V gives mRT V= PM 4.40 g × 8.31 J K–1 mol–1 × 300 K V= 90 × 103 Pa × 44.01 g mol–1 V = 2.8 × 10–3 m3 (= 2.8 dm3) 3 85 kPa × 2.50 dm3 P2 × 2.75 dm3 = 298 K 348 K Rearranging and solving for P2 gives the final pressure = 90 kPa P1 × V1 P2 × V2 = T1 T2 List all the data that is given in the question: 52 Using 55 At STP, 1 mole of the gas would occupy 22.7 dm3 1 mole would have a molar mass of 5.84 g dm–3 × 22.7 dm3 mol–1 = 133 g mol–1 From section 6 of the IB data booklet, xenon is the noble gas with the closest molar mass, 131.29 g mol–1 mRT PV List all the data that is given in the question: 56 Using M = ●● P1 = 1.00 × 105 Pa ●● V1 = 675 cm3 T1 = ??? ●● ●● m = 12.1 mg = 0.0121 g P2 = 2.00 × 105 Pa ●● ●● R = 8.31 J K–1 mol–1 V2 = 350 cm3 ●● ●● T = 25 °C = 298 K T2 = 27.0 °C (= 300 K) ●● ●● P = 1300 Pa ●● V = 255 cm3 = 255 × 10–6 m3 (1.00 × 105) Pa × 675 cm3 = T1 (2.00 × 105) Pa × 350 cm3 300 K Rearranging and solving for T1 gives initial temperature = 289 K = 16 °C P1 × V1 P2 × V2 = T1 T2 3 P1 × 4.0 dm 4P1 × V2 = T1 3T1 Rearranging and solving for V2 gives 53 Using V2 = 3 × T1 × P1 × 4.0 dm = 3.0 dm3 4 × P1 × T1 3 mRT PV List all the data that is given in the question: 54 Using M = ●● m = mass = 4.40 g ●● R = 8.31 J K–1 mol–1 ●● T = temperature in K = (273 + 27) = 300 K ●● P = pressure = 90 kPa = 90 × 103 kPa ●● M = molar mass = (12.01 + (2 × 16.00)) g mol–1 = 44.01 g mol–1 0.0121 g × 8.31 J K–1 mol–1 × 298 K 1300 Pa × 255 × 10–6 m3 = 90.4 g mol–1 mass 57 As density = for a fixed volume of gas, volume the density will depend on the formula mass of the element. Hydrogen has a formula mass of 2.02 g mol–1 and helium of 4.00 g mol–1. Hence helium has the greater density. M = 58 The equation for the complete combustion of octane is: 2C8H18 + 25O2 → 16CO2 + 18H2O 1 mole of octane reacts with 12.5 moles of oxygen. M(C8H18) = ((8 × 12.01) + (18 × 1.01)) g mol–1 = 114.26 g mol–1 n 125 g moles of octane = = M 114.26 g mol–1 = 1.09 mol Therefore 1.09 mol of octane react with 1.09 × 25 = 13.7 mol of oxygen 2 1 mol of gas occupies 22.7 dm3, hence 13.7 mol occupy 13.7 mol × 22.7 dm3 mol–1 = 311 dm3 9 mRT PV List all the data that is given in the question: 59 Using M = ●● m = 3.620 g ●● R = 8.31 J K–1 mol–1 ●● T = 25 °C = 298 K ●● P = 99 kPa = 99 × 103 Pa ●● V = 1120 cm3 = 1120 × 10–6 m3 M = 63 B Ideal gases are assumed to have no attractive forces between the particles; however, gases are not ideal. 64 number of moles required = concentration × volume 3.620 g × 8.31 J K–1 mol–1 × 298 K 99 × 103 Pa × 1120 × 10–6 m3 = 80.8 g mol–1 Oxygen Sulfur mass / g 2.172 moles 2.172 = 0.1357 1.448 = 0.04515 16.00 32.07 1.448 divide by smallest 3.01 1.00 nearest whole number ratio 1 3 Empirical formula = SO3 Since this has an Mr of 80.07, the empirical and molecular formulae must be the same. 60 At higher altitude the external pressure is less. As the air in the tyre expands on heating, due to friction with the road surface, the internal pressure increases. (This can be a much greater problem during a descent when friction from the brakes on the wheel rim causes the tyre to heat up further.) 61 (a) ● ●● ●● ●● Particles are in constant random motion and collide with each other and with the walls of the container in perfectly elastic collisions. The kinetic energy of the particles increases with temperature. There are no inter-particle forces. The volume of the particles is negligible relative to the volume of the gas. (b) At low temperature, the particles have lower kinetic energy, which favours the formation of inter-particle forces and reduces gas PV pressure. <1 nRT 10 62 NH3 shows greater deviation than CH4 due to stronger intermolecular attractions, especially at low temperature. = 0.200 mol dm–3 × 0.250 dm3 (1 dm3 = 1000 cm3) = 0.0500 mol Formula of potassium hydroxide is KOH. (You should know that the ions are K+ and OH–.) Molar mass of KOH = (39.10 + 16.00 + 1.01) g mol–1 = 56.11 g mol–1 Mass of 0.0500 mol of KOH = 0.0500 mol × 56.11 g mol–1 = 2.81 g 65 MgSO4.7H2O has a molar mass of (24.31 + 32.07 + 11 × 16.00 + 14 × 1.01) g mol–1 = 246.52 g mol–1 0.100 dm3 of a 0.200 mol dm–3 solution contains 0.100 × 0.200 g mol–1 = 0.0200 mol of solute 0.0200 mol of MgSO4.7H2O has a mass of 0.0200 mol × 246.52 g mol–1 = 4.93 g 66 In 0.250 dm3 of 0.0200 mol dm–3 of solution there are 0.250 × 0.0200 = 0.00500 mol of solute For every mole of ZnCl2, two moles of chloride ions are released in solutions: ZnCl2(s) → Zn2+(aq) + 2Cl–(aq) so, 0.00500 mol of ZnCl2 will give 0.0100 mol of chloride ions in solution 67 250 cm3 of solution contain 5.85 g of sodium chloride 1000 cm3 1 dm3 of solution contains 5.85 g = = 250 cm3 23.40 g of sodium chloride 23.40 g of NaCl is equivalent to 23.40 g = 0.400 mol (22.99 + 35.45) g mol–1 Hence concentration is 0.400 mol dm–3 68 100 cm3 of 0.50 mol dm–3 nitric acid contains 0.050 moles of acid volume of 16.0 mol dm–3 acid to contain this n 0.050 mol number of moles = = = 3.1 × c 16.0 mol dm 10–3 dm3 = 3.1 cm3 1.13 g 303.25 g mol–1 = 3.73 × 10–3 mol n(PbSO4) = m/M(PbSO4) = From the balanced equation: n(PbSO4) formed = n(Pb(NO3)2) reacted = n(Na2SO4) reacted = 3.73 × 10–3 mol 69 H2SO4 + 2NaOH → Na2SO4 + 2H2O moles of NaOH = cV = 0.147 mol dm–3 × 36.42 dm3 = 5.35 × 10–3 mol 1000 As this reacts with the sulfuric acid in a 2 : 1 ratio, the number of moles of sulfuric acid present = 2.68 × 10–3 mol n Hence concentration of sulfuric acid = = V 2.68 × 103 mol = 0.178 mol dm–3 15.00 dm3 1000 70 moles of KOH used in titration = cV = 0.0100 11.00 mol dm–3 × dm3 = 1.10 × 10–4 mol 1000 ( ) Since KOH reacts with HCl in a 1:1 ratio, moles of HCl = 1.10 × 10–4 mol n 1.10 × 10–4 mol Concentration of HCl = = 5.00 V dm3 1000 = 0.0220 mol dm–3 ( ) Molar mass of HCl = (1.01 + 35.45) g mol–1 = 36.46 g mol–1 Quantity of HCl is equivalent to 36.46 × 0.0220 = 0.802 g dissolved in 1 dm3 Concentration of HCl in g dm–3 = 0.0220 mol dm–3 × 36.46 g mol–1 = 0.802 g dm–3 Therefore in 1.00 cm3 there would be 0.000802 g of HCl Assuming a density of 1.00 g cm–3 a 1.00 cm3 sample of solution has a mass of 1.00 g mass HCl × 100 mass solution 0.000802 g = × 100 = 0.0802% 1.00 g %HCl = 71 Na2SO4(aq) + Pb(NO3)2(aq) → PbSO4(s) + 2NaNO3(aq) First determine the moles of PbSO4 formed in the reaction: [Pb(NO3)2] = [Na2SO4] = 3.73 × 10–2 mol n = V (32.50/1000) dm3 = 0.115 mol dm–3 n 3.73 × 10–3 mol = V (35.30/1000) dm3 = 0.106 mol dm–3 Two assumptions are: (i) No side reactions occur that generate other products. (ii) All of the PbSO4 formed precipitates out as a solid and can be weighed. Practice questions Questions 1–17 are multiple-choice questions similar to those in Paper 1 of the IB examinations. As calculators are not allowed in Paper 1 it is appropriate for whole-number values to be used for molar masses. Any relevant constants can also be rounded where appropriate to make the calculations simpler. 1 One mole of CuSO4.5H2O will contain 9 moles of oxygen atoms. 0.100 moles of CuSO4.5H2O will contain 0.900 moles of oxygen atoms. 0.900 moles = 0.900 × NA atoms = 0.900 × 6.02 × 1023 atoms = 5.42 × 1023 atoms. Correct answer is D. 2 The balanced equation is Fe2O3(s) + 3CO(g) → 2Fe(s) + 3CO2(g). Sum of coefficients = 1 + 3 + 2 + 3 = 9. Correct answer is D. 3 We can assume that the gases are all ideal gases. This means that under the same conditions of pressure, volume and temperature, they all contain the same amount of gas molecules. 11 The heaviest container will therefore contain the gas with the largest molar mass. Nitrogen: M(N2) = 2 × 14 g mol = 28 g mol –1 –1 Oxygen: M(O2) = 2 × 16 g mol-1 = 32 g mol–1 Ethane: M(C2H6) = (2 × 12) + (6 × 1) g mol–1 = 30 g mol–1 Neon: M(Ne) = 20 g mol–1 Oxygen has the largest molar mass so the heaviest container will be B. Correct answer is B. 4 This can be solved by converting temperatures from degrees Celsius to Kelvin and applying V Charles’ Law, = constant: T V1 V2 = T1 T2 V T 1.0 dm3 × 323 K V2 = 1 2 = = 1.1 dm3 T1 298 K Correct answer is C. 100 dm3 1000 = 0.0020 mol = 2.0 × 10–3 mol 5 n(FeSO4) = cV = 0.020 mol dm–3 × n(SO42–) = n(FeSO4) = 2.0 × 10–3 mol Correct answer is A. 6 To calculate a concentration we first need to convert the mass of NaNO3 to moles using the Mr of 85 provided for NaNO3: 1.7 g n(NaNO3) = = 0.020 mol 85 g mol–1 n 0.020 mol [NaNO3] = = 0.10 mol dm–3 = V 0.20 dm3 Correct answer is B. 7 From the balanced equation provided in the question: 3 n(H2) produced = n(Al) reacted 2 If 3 mol of Al reacts, the amount of H2 produced 3 = × 3 mol = 4.5 mol. 2 m(H2) = nM(H2) = 4.5 mol × 2 g mol–1 = 9.0 g Correct answer is D. 8 Based on the empirical formula of the gas, CH2, the relative formula mass can be calculated: 12 relative formula mass (CH2) = 12 + (2 × 1) = 14 Dividing the relative molar mass by the relative formula mass gives us the multiplier, x, that must be applied to the empirical formula to give the molecular formula: relative molecular mass 56 x= = =4 relative formula mass 14 Molecular formula = ‘4 × CH2’ = C4H8 Correct answer is D. 9 The balanced equation is 2C2H2 + 5O2(g) → 4CO2(g) + 2H2O. Sum of coefficients = 2 + 5 + 4 + 2 = 13 Correct answer is D. 10 1 mole of benzamide, C6H5CONH2, will contain 7 moles of hydrogen atoms. 1.0 moles of C6H5CONH2 will contain 7.0 moles of hydrogen atoms. 7.0 moles = 7.0 × (6.02 × 1023) atoms = 4.2 × 1024 atoms Correct answer is D. 11O2 is the limiting reagent as 10.0 mol of C2H3Cl would require 25.0 mol of O2. 2 From the balanced equation, n(H2O) = n(O2). 5 If 10.0 mol of O2 reacts the amount of H2O 2 produced = × 10.0 mol = 4.00 mol. 5 Correct answer is A. 12 We first calculate the total number of moles of NaCl present in the two solutions: n(total) = n(solution 1) + n(solution 2) = c1V1 + c2V2 10.0 = (0.200 mol dm–3 × dm3) + (0.600 mol 1000 30.0 dm–3 × dm3) 1000 = 0.00200 mol + 0.0180 mol = 0.0200 mol 0.0200 mol n = (10.0 + 30.0) (V1 + V2) dm3 1000 0.0200 mol = = 0.500 mol dm–3 0.0400 dm3 [NaCl] = Correct answer is C. 13 Determine the empirical formula of the compound. C H O Mass (g) 12 2 16 12 g 2g 16 g Moles 12 g mol–1 1 g mol–1 16 g mol–1 = 1.0 = 2.0 = 1.0 Empirical formula = CH2O Formula mass (CH2O) = (12 + (2 × 1) + 16) g mol–1 = 30 g mol–1 Dividing the molar mass by the formula mass gives us the multiplier, x, that must be applied to the empirical formula to give the molecular formula: relative molecular mass 60 g mol–1 =2 x= = relative formula mass 30 g mol–1 Molecular formula = ‘2 × CH2O’ = C2H4O2 Correct answer is D. 14 We can calculate the final concentration, c2, using the dilution formula c1V1 = c2V2. c1 V1 0.5 mol dm–3 × 200 cm3 = V2 (200 + 300) cm3 0.5 mol dm–3 × 200 cm3 = = 0.2 mol dm–3 500 cm3 c2 = Correct answer is C. 15 The question asks for an approximate value so we can use whole numbers for the atomic masses of the constituent elements of MgSO4.7H2O: M(MgSO4.7H2O) = (24 + 32 + (4 × 16) + (14 × 1) + (7 × 16)) g mol–1 = 246 g mol–1 Correct answer is D. 16 For a molecular formula to also be an empirical formula it cannot be converted to a simpler ratio. With the exception of C5H12 all of the formulas provided can be simplified. m 65.0 g = M(NaN3) 65.02 g mol–1 = 1.00 mol (b) n(NaN3) = (c) From the balanced equation, n(N2) = 3 3 n(NaN3) = × 1.00 mol = 1.50 mol. 2 2 We can calculate the volume of N2(g) produced using the ideal gas equation, PV = nRT, recognizing that temperature must be converted to K and pressure to Pa: 25.00 °C = (25.00 + 273.15) K = 298.15 K 1.08 atm = 1.08 × (1.01 × 105) Pa = 1.09 × 105 Pa 17(a) Temperature is 25.00 °C. This has four significant figures. Mass is 0.0650 kg. This has three significant figures. nRT = P 1.50 mol × 8.314 J K–1 mol–1 × 298.15 K = 1.09 × 105 Pa 0.0341 m3 = (0.0341 × 1000) dm3 = 34.1 dm3 V= 18 (a) The amount of C present in J can be found from the mass of CO2 formed in the combustion reaction: m 0.872 g = M(CO2) 44.01 g mol–1 = 0.0198 mol n(CO2) = n(C) = n(CO2) = 0.0198 mol mass of C = nM = 0.0198 mol × 12.01 g mol–1 = 0.238 g 0.238 g % mass of C in J = × 100% 1.30 g = 18.3% The amount of H present in J can be found from the mass of H2O formed in the combustion reaction: n(H2O) = n(H) = 2 × n(H2O) = 2 × 0.0049 mol = 0.0098 mol mass of H = nM = 0.0098 mol × 1.01 g mol–1 = 0.0099 g C5H10 → CH2 C4H8 → CH2 C4H10 → C2H5 Correct answer is A. Pressure is 1.08 atm. This has three significant figures. m 0.089 g = M(H2O) 18.02 g mol–1 = 0.0049 mol 13 0.0099 g × 100% 1.30 g = 0.76% % mass of H in J = (An answer of 0.77% is also acceptable. This value is obtained if the calculation is performed in a single step and no rounding error is introduced.) (b) The amount of Cl present in J can be found from the mass of AgCl formed in the precipitation reaction: m 1.75 g = n(AgCl) = M(AgCl) 143.32 g mol–1 = 0.0122 mol n(Cl) = n(AgCl) = 0.0122 mol mass of Cl = nM = 0.0122 mol × 35.45 g mol–1 = 0.432 g 0.432 g % mass of Cl in J = × 100% 0.535 g = 80.7% (An answer of 80.9% is also acceptable. This value is obtained if the calculation is performed in a single step and no rounding error is introduced.) (c) We can determine the empirical formula using the % compositions obtained in part (b) and the mass that would be in a 100 g sample of J. C Mass/g M/g mol 18.3 0.76 O From the balanced equation, n(NO) = 1.5n(NH3) Therefore assuming ideal gases, V(NO) = 1.5V(NH3) 30.0 dm3 of NH3 would require 1.5 × 30 cm3 of NO = 45.0 dm3 of NO As there are only 30.0 dm3 of NO it is the limiting reactant and NH3 is in excess. We can determine how much NH3 reacts with 30.0 dm3 of NO: V(NO) 30.0 dm3 V(NH3) = = = 20.0 dm3 1.5 1.5 The volume of excess NH3 = 30.0 dm3 – 20.0 dm3 = 10.0 dm3 Using the balanced equation, the volume of N2 produced can be determined from the volume of NO reacted: 5 5 V(N2) = V(NO) = × 30.0 dm3 = 25.0 dm3 6 6 27.20 20 (a) n(HCl) = c × V = 0.200 mol dm–3 × dm3 1000 = 0.00544 mol (b) We need to write the balanced equation for the neutralization of HCl(aq) with NaOH(aq): HCl(aq) + NaOH(aq) → NaCl(aq) + H2O(l) From the balanced equation, n(HCl) = n(NaOH): 23.80 n(NaOH) = cV = 0.100 mol dm–3 × dm3 1000 = 0.00238 mol 80.7 12.01 1.01 16.00 Number of moles/mol 1.52 0.75 2.28 Divide by smallest 2.03 1.0 3.04 1 3 –1 Nearest whole number ratio 2 14 H 19 We can determine which gas is in excess based on the assumption that they are ideal gases and therefore the volumetric ratios are the same as the molar ratios. Empirical formula of J = C2HCl3 The formula mass of C2HCl3 = (2 × 12.01) + 1.01 + (3 × 35.45) g mol–1 = 131.38 g mol–1. As the formula mass calculated for the empirical formula is the same as the molar mass given in the question the molecular formula of J is confirmed as C2HCl3. n(HCl) in excess = 0.00238 mol (c) The amount of HCl that reacted with the calcium carbonate in the eggshell is found from the difference between the original HCl added and the excess HCl that then reacted with the NaOH: n(HCl reacted) = 0.00544 mol – 0.00238 mol = 0.00306 mol (d) 2HCl(aq) + CaCO3(s) → CaCl2(aq) + H2O(l) + CO2(g) ( An acceptable alternative that omits spectator ions is: 2H+(aq) + CaCO3(s) → Ca2+ (aq) + H2O(l) + CO2(g) 21 We first need to determine the number of moles of AgCl solid that were precipitated: m 6.127 g = M(AgCl) 143.32 g mol–1 = 0.04275 mol Subbing y into (1) x + 0.91 = 2.450 The sample contains 1.54 g of NaCl and 0.91 g of CaCl2. mass NaCl 1.54 g % NaCl = × 100% = × total mass 2.450 g 100% = 62.9% mass CaCl2 0.91 g % CaCl2 = × 100% = × 100% total mass 2.450 g = 37.1% 22 (a) We first find the mass of water that was removed in drying the potassium carbonate: m(H2O) = m(hydrated K2CO3) – m(dry K2CO3) = 10.00 g – 7.93 g = 2.07 g m 2.07 g = M(H2O) 18.02 g mol–1 = 0.115 mol n(H2O) = m 7.93 g = M(K2CO2) 138.21 g mol–1 = 0.0574 mol We can now solve this problem using simultaneous equations: (c) We can determine the value of x in the hydrated potassium carbonate: Let x = mass of NaCl in g Let y = mass of CaCl2 in g (1) We can determine a second equation based on the number of moles of Cl– in the two solids along with the total number of moles of Cl– in the precipitate: n(Cl– from NaCl) + n(Cl– from CaCl2) = 0.04275 ( ) ) (2) Applying simultaneous equations: x + y = 2.450 x = 1.54 (b) n(K2CO3) = n(Cl–) = n(AgCl) = 0.04275 mol ( (2′) 0.053y = 0.048 0.048 y= 0.053 = 0.91 n(AgCl) = x y = 0.04275 +2 M(NaCl) M(CaCl2) x y = 0.04275 +2 58.44 110.98 (2) (2′) – (1) (e) From the balanced equation in (d) the amount of CaCO3 can be determined based on the amount of HCl that reacts: 1 n(CaCO3) = n(HCl reacted) 2 1 = × 0.00306 mol = 0.00153 mol 2 (f) m(CaCO3) = nM(CaCO3) = 0.00153 mol × 100.09 g mol–1 = 0.153 g mass of CaCO2 % CaCO3 in eggshell = × mass of eggshell 0.153 g 100% = × 100% = 81.4% 0.188 g (g) The main assumption is that CaCO3 is the only component of the eggshell that reacts with HCl, i.e. there are no basic impurities present in the eggshell that would also react with HCl. x + y = 2.450 ) x y = 0.04275 +2 58.44 110.98 (2) × 58.44 x + 1.053y = 2.498 (1) n(H2O removed) = n(dry K2CO2) 0.115 mol 0.0574 mol x= Therefore the formula of the hydrate is K2CO3.2H2O = 2.00 (d) By repeating the process of heating and weighing until a constant mass is obtained. (To ensure accurate results it will be necessary to cool the sample to room temperature before each weighing.) 23(a) We can determine the moles of each reactant using the ideal gas law, PV = nRT, recognizing that temperature must be converted to K, pressure to Pa and volume to m3. 15 25(a) 2Al(s) + 3CuSO4(aq) → Al2(SO4)3(aq) + 3Cu(s) For ammonia gas: T = (42 + 273) K = 315 K, P = 160 × 10 Pa, 625 V= m3 = 6.25 × 10–4 m3 1 × 106 PV 160 000 Pa × 6.25 × 104 m3 n(NH3) = = RT 8.31 J K–1 mol–1 × 315 K = 0.0382 mol 3 For hydrogen chloride gas: T = (57 + 273) K = 330 K, P = 113.3 × 103 740 Pa, V = m3 = 7.40 × 10–4 m3 1 × 106 PV 113 300 Pa × 7.40 × 104 m3 n(HCl) = = RT 8.31 J K–1 mol–1 × 330 K = 0.0306 mol (b) 2Al(s) + 3CuSO4(aq) → Al2(SO4)3(aq) + 3Cu(s) The question is about the reacting ratio of the terms in red. x 10.38 Mole ratio 2Al:3CuSO4so= 2 3 x mol:10.38 mol x = 6.920 mol Al (c) 2Al(s) + 3CuSO4(aq) → Al2(SO4)3(aq) + 3Cu(s) Mole ratio 3CuSO4:3Cu = 1:1 Therefore 3.95 mol Cu is produced from 3.95 mol CuSO4. Therefore ammonia gas (NH3) is in excess. (b) If ammonia gas is in excess then the hydrogen chloride gas (HCl) is limiting. (d) The colour changes that occur when metals react with solutions of other metal ions will become familiar after you have studied redox reactions in Chapter 9. (c) The balanced equation for the reaction is NH3(g) + HCl(g) → NH4Cl(s). From this equation, n(NH4Cl) = n(HCl) = 0.0306 mol. m(NH4Cl) = nM(NH4Cl) = 0.0306 mol × 53.50 g mol–1 = 1.64 g 24(a) 2PbS(s) + 3O2(g) → 2PbO(s) + 2SO2(g) Challenge yourself 1 In cold climates, the temperature may approach or go below the boiling point of butane so the butane stays liquid even when it is released from the pressure it is under when stored in its canister. This makes it ineffective as a fuel in these heating devices in cold climates as they require gaseous fuels. 2 We can determine which compounds are hydrated by comparing the molar masses provided in the photograph with the calculated molar masses for the unhydrated compounds. (b) 2PbS(s) + 3O2(g) → 2PbO(s) + 2SO2(g) The terms in red indicate those of interest to the question. Mole ratio 2PbS:2SO2 = 1:1 M(PbS) = 207.19 + 32.06 = 239.25 g mol–1 M(SO2) = 32.06 + (16.00 × 2) = 64.06 g mol–1 Therefore 239.25 g PbS → 64.06 g SO2 1 tonne × 64.06 g 239.25 g = 0.268 tonne = 0.268 × 103 kg = 268 kg So 1 tonne PbS → Note this question only asks for amounts in moles so it is not necessary to calculate the molar masses of the reactants and products. Compound 16 (c) The calculation assumes that PbS is the limiting reactant and so is fully reacted in the presence of excess oxygen. It also assumes that the only reaction occurring is the production of PbO and SO2. potassium iodide (KI) Mass Calculated Hydrated or shown in molar mass unhydrated photograph 166.0 g mol–1 166.0 g mol–1 unhydrated sodium chloride 58.5 g mol–1 58.5 g mol–1 unhydrated (NaCl) Compound Mass Calculated Hydrated or shown in molar mass unhydrated photograph 158.0 g mol–1 4 unhydrated Many reactions with ‘useless’ by-products could have a high stoichiometric yield under optimum conditions, but low atom economy, for example the production of methanoic acid from the reaction of sodium methanoate and sulfuric acid: potassium manganate(VII) (KMnO4) 158.0 g mol–1 iron(III) chloride (FeCl3) 270.3 g mol–1 162.2 g mol–1 hydrated For 100% conversion with stoichiometric reactants, the yield = 100%. copper(II) sulfate 249.7 g mol–1 (CuSO4) 159.6 g mol–1 hydrated mass of desired product % atom economy = total mass of reactants × 100% cobalt(II) nitrate 291.0 g mol–1 (Co(NO3)2) 183.0 g mol–1 hydrated 2 × M(HCOOH) × 100% 2 × M(NaHCOO) + M(H2SO4) 2 × 46.03 × 100% = 2 × 68.01 + 98.08 2NaCOOH + H2SO4 → 2HCOOH + Na2SO4 = Iron(III) chloride, copper(II) sulfate and cobalt(II) nitrate are hydrated. = 39.33% Formulas of hydrated compounds Mass of H2O in one mole of hydrated FeCl3 = 270.3 g – 162.2 g = 108.1 g m 108.1 g n(H2O) = ≈6 = M(H2O) 18.02 g mol–1 In 1 mole of hydrated iron(III) chloride there are 6 moles of water, therefore the formula of hydrated iron(III) chloride is FeCl3.6H2O. 5 2NaN3(s) → 2Na(s) + 3N2(g) Sodium metal is hazardous so it is converted to sodium oxide, Na2O, through reaction with potassium nitrate, KNO3: Applying the same working to the hydrated copper(II) sulfate and cobalt(II) nitrate gives the formulas CuSO4.5H2O and Co(NO3)2.6H2O. 3 10Na(s) + 2KNO3(s) → K2O(s) + 5Na2O(s) + N2(g) From the information box on page 24 we can see that a N-P-K rating of 18-51-20 means the fertilizer is 18% N, 51% P2O5 and 20% K2O. 2 × Mr(P) × % P2O5 Mr(P2O5) 2 × 30.07 = × 51 = 0.436 × 51 (2 × 30.07 + 5 × 16.00 = 22% The oxides formed in the above reaction are then reacted with silicon dioxide to form the harmless silicate Na2K2SiO4 (alkaline silicate glass): K2O(s) + Na2O(s) + SiO2(s) → Na2K2SiO4 %P= 2 × Mr(K) × % K2O Mr(K2O) 2 × 39.10 = × 20 = 0.830 × 20 (2 × 39.10 g + 16.00 = 17% % K = From the information on page 33, the main reaction in an airbag is the conversion of sodium azide, NaN3, to nitrogen gas, N2. Recognizing that solid sodium must be the other product gives the balanced equation: 6 As NaOH dissolves, the separated Na+ and OH– ions become hydrated due to the polar H2O molecules being attracted to the charge on the ions and surrounding them. This attraction to the ions disrupts the hydrogen bonding between the H2O molecules and allows for closer packing of the H2O molecules in the NaOH solution, which reduces the volume of the solution. % N = 18%, % P = 22%, % K = 17% 17
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